Sign-changing multi-peak standing waves of the NLSE with a point interaction
Abstract
Consider the following semilinear problem with a point interaction in RN: \[- α u + ω u = u |u|p - 2,\] where N ∈ \2, 3\; ω > 0; - α denotes the Hamiltonian of point interaction with inverse s-wave scattering length - (4 π α)- 1 and we want to solve for u RN R. By means of Lyapunov--Schmidt reduction, we prove that this problem has sign-changing multi-peak solutions when either (1) N = 2, α ∈ R, p* < p ≤ 3 and ω is sufficiently large or (2) N = 3, 0 < α < ∞, p* < p < 3 and ω is sufficiently small, where 2.45 < p* := 9 + 1138 < 2.46.
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